Centralizing automorphisms and Jordan left derivations on σ-prime rings

Abstract

Let R be a 2-torsion free σ-prime ring. It is shown here that if U⊂ Z(R) is a σ-Lie ideal of R and a, b in R such that aUb=σ(a)Ub=0, then either a=0 or b=0. This result is then applied to study the relationship between the structure of R and certain automorphisms on R. To end this paper, we describe additive maps d: R R such that d(u2) = 2ud(u) where u∈ U, a nonzero σ-square closed Lie ideal of R.